I'm trying to write something that appears to be analagous to "rank 2 types", but for constraints instead. (Or, maybe it's not correct to assume changing
-> in the definition of "rank 2 types" to
=> is meaningful; please edit the question if you think up better terminology).
Suitable typeclass (from Data.Suitable, the base of rmonad) can be used to denote types of values which can be used. In this question, I'll use
Suitable m a
to denote that value
a can be used as a value for some functions of the monad
m (in particular, if
m is a DSL, then its values are usually
a which are suitable), for example
class PrintSuitable m where printSuitable :: Suitable m a => a -> m ()
See the top comment for RMonad [ link ] and its source for an example of how to use Suitable. For example, one could define
Suitable m (Map a b), and print the number of elements in the map.
goal: Now, I have a monad transformer
MyMonadT, and want to make
MyMonadT m a
PrintSuitable instance whenever
m is a
rank 2 constraints motivation: The issue is that the type
a is introduced with regard to the
printSuitable function, i.e. does not appear in the
class signature. Since one can only add constraints to the
class signature (additional constraints to an
instance function implementation are illegal), it makes sense to say something about all
a in the class signature (line 2 below).
Below shows the intended code.
instance (PrintSuitable m, MonadTrans t, (forall a. Suitable (t m) a => Suitable m a), -- rank 2 constraint ) => PrintSuitable (t m) where printSuitable = lift ... -- MyMonadT doesn't change what values are Suitable, hence the rank 2 expression, -- (forall a. Suitable (t m) a => Suitable m a) should hold true data instance Constraints (MyMonadT m) a = Suitable m a => MyMonadT_Constraints instance Suitable m a => Suitable (MyMonadT m) a where -- the important line constraints = MyMonadT_Constraints instance MonadTrans MyMonadT where ... -- now, MyMonadT m is a PrintSuitable whenever m is a PrintSuitable -- the manual solution, without using MonadTrans, looks roughly like this instance PrintSuitable m => PrintSuitable (t m) where printSuitable a = withResConstraints $ \MyMonadT_Constraints -> ...
the constraint indicated says that anything that's suitable in
(t m) is suitable in
m. But, of course, this isn't valid Haskell; how could one encode a functional equivalent?
Thanks in advance!!!